A particle `A` moves with velocity `(2hati-3hatj)m//s` from a point `(4,5m)m`. At the same instant a particle `B`, moving in the same plane with velocity` (4hati+hatj)m//s` passes through a point `C(0,-3)m`. Find the `x`-coordinate (in `m`) of the point where the particles collide.

A particle A moves with velocity ( 2 ˆ i − 3 ˆ j ) m / s from a point ( 4 , 5 m ) m . At the same instant a particle B , moving in the same plane with velocity ( 4 ˆ i + ˆ j ) m / s passes through a point C ( 0 , − 3 ) m . Find the x -coordinate (in m ) of the point where the particles collide.

A particle A moves with velocity ( 2 ˆ i − 3 ˆ j ) m / s from a point ( 4 , 5 m ) m . At the same instant a particle B , moving in the same plane with velocity ( 4 ˆ i + ˆ j ) m / s passes through a point C ( 0 , − 3 ) m . Find the x -coordinate (in m ) of the point where the particles collide.

A particle moving with velocity (2hati-3hatj) m/s collides with a surface at rest in xz–plane as shown in figure and moves with velocity (2hati+2hatj) m/s after collision. Then coefficient of restitution is :

A particle moving with velocity (2hati-3hatj) m/s collides with a surface at rest in xz–plane as shown in figure and moves with velocity (2hati+2hatj) m/s after collision. Then coefficient of restitution is :

A particle of mass m moving with a velocity (3hati+2hatj)ms^-1 collides with another body of mass M and finally moves with velocity (-2hati+hatj)ms^-1 . Then during the collision

A particle of mass m moving with a velocity (3hati+2hatj)ms^-1 collides with another body of mass M and finally moves with velocity (-2hati+hatj)ms^-1 . Then during the collision

A particle is projected from ground with velocity 3hati + 4hatj m/s. Find range of the projectile :-

A particle is projected from ground with initial velocity 3hati + 4hatj m/s. Find range of the projectile :-